02/10/2011, 01:25 PM
about the continuum sum again :
we already know how to get the continuum sum analogue of an integral of an entire function.
for non-entire functions i suggest that the continuum sum is the analogue of the cauchy principle value and by taking the usual continuum sum as analogue of the integral ;
we can have a continuum sum analogue of the Sokhatsky–Weierstrass theorem !
this advances continuum sum theory a step further i believe.
gotta run
tommy1729
we already know how to get the continuum sum analogue of an integral of an entire function.
for non-entire functions i suggest that the continuum sum is the analogue of the cauchy principle value and by taking the usual continuum sum as analogue of the integral ;
we can have a continuum sum analogue of the Sokhatsky–Weierstrass theorem !
this advances continuum sum theory a step further i believe.
gotta run
tommy1729