Sonata for Clarinet and Piano

Keane Southard

Sonata for

Clarinet and Piano

(2016) (Duration: c. 14 mins.)

Program notes: This Sonata for Clarinet and Piano was commissioned by the Colorado State Music Teachers Association and premiered at their 2016 state conference at Colorado State University-Pueblo. I grew up playing the clarinet as my second instrument (after the piano) and played it in all of the school bands until the end of high school, but I'd be the first to say that I'm not a good clarinetist at all as I essentially never practiced and haven't performed on the instrument since high school. Nevertheless, I have retained a fondness for the instrument as well as a decent knowledge of fingerings and how the instrument works and sounds. The work is in three movements following a slowfast-slow structure, and is unified through the continuous use of the interval of a perfect 4th. Keane Southard 2016

Performance instructions: 1. Tenuto marks (-) over notes indicate more weight/stress on the note and does not indicate space to be placed in between that note and the next (unless the tenuto is combined with a staccato). 2. Unless otherwise indicated, the damper pedal (for the piano) should be used discreetly to allow for maximum clarity. 3. Dynamics that are in parentheses indicate what the dynamic marking should approximately be in the midst of a long crescendo or diminuendo.

Keane Southard/Spindrift Pages Email: keane.southard@hotmail.com Website: keanesouthard.instantencore.com

Commissioned by the Colorado State Music Teachers Association

Sonata for Clarinet and Piano I - Ostinati

Transposed Score Clarinet in Bb

e = 88

  

 

Piano



 





mp

Keane Southard

  







    



f



                         

with ped. 3

   

       





 

        

mp

     

          mp

   

f

                   mp sempre

5

  

 

 

 

3            



  

        

   mp

 

    

   

f

                 

mp

 

f





   



   f



       f

                   

©2016

2 7

  

 

  

    

  

       mp



   

 

         mp

9

3

        



     



p

  

   

                   

 6          

11



6

mp

         mp

   

 

   



        

  



mf

       mf



     

       

 

    

  

f



 

   

   

     

   



    

f

                                              

    

     

 

  





     p

        



             

   



  

      

     

        

3

    

13



   

mp

      

  

14

 

   

 

  



   

f

   



  

f

   

 

 

     

   

15

p



 

 

     

     

 

   

  

    

 

 

  

 

 

   







  





 



 

           



    

 

  

 

 



               3



    

  

p

   





 

              

 







 

        

    



 

   

  

mp





   

 

 

 

 

  



4 rit.

        

16

mf

  



 

 

    

   

    

e = 68

   

 

   

  

   

p

    

  

mf



p

                       

          

< e = e. >

  

    

     



     

20

  

(e= 48) e = 72 ( e. = 48)

rit.

18



     

 



 

 

    

                

    





 



                   

mp

     

                     mp

p

                          p

                

 

 

 

mp

 

 

   

   

5 22

       









 



p

      p

                                                        p

     

                                           

24

  

mp

                       mp

f

       mp

    

26

 







   

   

 

 

  

 f

           f

                         

3                   

                                 mp

 

 

f

                    

 

 

 

 

 

6

28

 

   mf

    

 



           





    

p

               p

mf

                              



pp sempre

31





            

33



             

   

mp

    

    

    

(A)

    

  

p

   

(A)

  

      

  

  

    

      



 

   

p

 

3           

 

   

  

   

      



       

mf





  

   

 

           

mf

     

mp

     

   

   

     

  



 

   



poco rit.

35

    p

     

     p

  

 

 (A)

37



           

          

 





 

     

  

7

 

    

f

          

  

f



 

      cresc.

  

            



   

     

 

  

    

     

cresc.

        



39



       

         

  



 





   

    









   

   

  



    

        

ff



    

  



     



      

    



  

   

 



molto rit.

ff



 

                       

        

8 42

  

A tempo ( e. = 48 )

 

 

           

 



      

44

  

      

          

    

 

   

 





 



        

   

           

46

 



        



          

 



 

3

  

 

3

    

         

         

    

f

 

 

     

 

      

    

 

  

 

3

       



 



f

      

 

  



   

    

 

           

p

p

f

  



    

               

 f

                

      

  

p

p

3

3

      

ff

 

     

                      



48

  



3

  

  

3



3







      

  

  

     



ff

  

     

49



3

      

3



3

    

 



    

3





3

    

   3

9

     3

 

 

 

  

 

     

  

                           3 3 3

 

 

    

3

3

3

  

 

  

    

  

  

    

  

  3                         

50

3

f

   

 

f

   

               

  

3

3

 

             

 

 

10 52



 

 



fff

          fff

         

         

 

 



 

 

    

                                                  

54

  







 

 

    

ff

           

dim. poco a poco

         

      



    

  

   

    

    

 

                                                       

  

56

 

        (ff)

          

  

 

  

   3

 

      

 

  

  

  

                                                 

 

     

11

58

  



   

   

            

  

    

    

 

      

                              

 

  

60



f

           

         

(f)

  

    

     

   

 

    

      3

   

                                                 62

 



       



 







3

3

3

         





3

 

      

                      

         

  

 

                     

3

3

      

         

     

  

 

   

    

 

 

 

                           

12

  

64





   mf

       



  

  

         

(mf)

          

                              

66

  

    



          



      

68

  



mp











    





       



 



   

f



 

 



    

     

 



 

  

 

   

       

 







 



 

    

       

              

           

(mp)

   

 

        

            

         

           

     

    

          

  

 

 

 

   

    

 

   

13

   rit.

70

  

 

   

p

 

   



                                    

73

  





e = 76 (Slower than Tempo I)

 



pp

    

  

p

 

   

   

75

   

       

    

   

     

  

  

                     



   mp

       

    

 



                        

                      

   





     

                 







      

         

                      3

                                                

        



14

       rit.

 

       

 

                     

77

        

e = 60 79

 



 

  



  

   

p

   

   

  



 

      

    

 

  



 



 

 

ppp

             ppp

   



        

molto rit.

               pp



   

n

II - Scherzo

 

Keane Southard

q = 148



 

 ff                    5

 

 

  



















                     9





   

                   























 













                  











 



   

pp

 

                  



 

         

                        

©2016

f





     p



16 13









 

  

p

     

                         16

  

     

















                        



ff



 



 



                         ff



  



mp

f

p

 





p



ff

f

 





    



mf



f



p



                                              

18

mf

  

 

mf

   

 



   

      

   

17 20





  

ff





            

f







         mp

                             f

23

    



 

           mp



    

        

                           f





     3

 f                           

 

 



                           f

3



26





              

 

    

    

    

           mp 3

3

          



                   mp

     

  

mp



   





         





18



          3



3

                 

 



32

     

     

34



             

q=q

29





       

ff

          ff                 

        

                       

                

      

  



       

  



   

   



      

                                  

 

       

    

  

          

 

  

            

               3

       

     

           

3



                   fff

fff

         

19 37







                             mf



f

  





 



     





      

         

  

mf

        





q=q

40







                         f

       42

      ff



 



   mp



 ff mp

sempre staccato





ppp

              



   

 

      

    

         



                                                        

20 44



 



 

 

       



             

 







                                                  

   

46





         









   

     

p



                            

48

                



                            p











 







                                         





        







            

21

      

50



 



     



        







 





                                                        

52



 



 



  

  



 





 



      









                                                  

54





  

     



   



                            

  

 









pp



 

  

                           pp



22

         

56

     

   



 







    

                                                  



            mf

58











 



 



  

     

                                                            



mf



 q=q

60

   



       

                  

                                                          













q=q



62

 





 

 

f

64

 



  

67



     





 7   



 

 



7





      



      



7

 

7



7

     



7

      



    7   

7

   





 



      



7   



 

7



    

7

  



 





f

f

     

7





 



 





7







 



    



 

   



ff

ff

f

  





              

        

 



 

23

  

   





7

24



70



    

  





7   

73





    





 

  7  





  

     7







    7



 



 

   

7  





 

     7



   

  7 







    7

 

  

      sfz 7

 

  

 

   

7

75

 









  



      7

 



       7



 

    



     7

 



     7

 

25

     

77



    









79



      



     







 7    



  







 

   

7



 





 

7   

    

  







7

 

  

  

7  



 7   



7

    

    



7



7



   

 

    

    

82





7







7







  



7



7



   

   



   

     





7



26 84

 

   

86





 

















   









     

7







 



    







 





7

 mf



  









cresc. poco a poco

7



     



7

  

p





   

7

poco rit.



 

7

    

  





    

   

7





88

 p

 

 



  



7







7

A tempo





  

f



7

  

f





 

7

  

 

 

7



27 rit.

90



  

  



 

   



  



7





7

     

   

 



7



     

 

7





A tempo

    

93

        



ff

mf

f





              

                            

95





mp

                  mp





mf

f

 

          



   p



                

     





p





28 97

 









pp

                                                                                            pp

 

99





p











mp





 mf

mp

                                                                                     senza ped.!

101







 n



  3"-4", then attacca



                                               

  3"-4", then attacca

 

III - Passacaglia Keane Southard  

e = 76





                                ff                                  4





                                          

 p

       

  

p

  

  espress.





         

  

                        

                               





     



pp

                      

       

 

7



    

       

     



mp

       

p

 

                



 

  

  

  

  

   

        

 

©2016

 

    pp

 

30

            

 

9

 

mf

  

    

mp



11













  

 



  



   

  

      

   

   

   

  

   

     



  

  

   

 





mf

         

 

p

    



p

 

                5

    

    

 

mf

mf

  

  



f



              

f

    



mp

 

 

13

  p

  



p





                

           

 

 



  

 

                 

  

mf

  

 3       

31 15

 







p









19



 

    

 

 

mp

  

 3                                 

     

  

 

                    f                   

mf

 



  

  

         

  

       

   



  

 





  

    

mf

mf

       

mp

 



 

pp

            p           

17

 



  

  

  



3  

  

  

  

  

  

  

  







                 f



      

   

32

 

21



 f



 





  

   

 

f



23

 

 

 

  



 

  

 

 

 

 



   

 

 

 



   ff

 3         ff

     

   

  

   

  

    



    

3

  

  

  

  

  

 3          

   

  

  

  

      

           

  

     

  

  

   

33 (x = 64)

           24   3              molto rit.

        

               

     25





     3               

  

A tempo

   

27

 

p

fff

    

f

ff

    

3

  



             

 

  3

3

       

                           

              

        

   

3

  

3

              

f



  

ff

                                    

 3   3   3   3                                         3 

3

                                    



    

3

                            

fff



        

                     

    

   

34 29

 

           

   

mf

3

                               mf               

32



5

     

3

3

3



    

f

       

 

3

 

  

 

               

5

                   

        

 

   

  

       

   

 

ff

  

                   3

3

 

ff

molto rit.



                            

3

3

3

 

  



f

                          

       

34

 

 

         

    



fff

ffff

                                                       fff

               

ffff

         

   

bring out top notes

      