series |
resummation |
As nouns the difference between series and resummation
is that
series is a number of things that follow on one after the other or are connected one after the other while
resummation is a procedure to obtain a finite result from a divergent sum (series) of functions, involving the integral transformation of another (convergent) function in which the individual terms defining the original function are rescaled.
As an adjective series
is connected one after the other in a circuit.
sum |
resummation |
As nouns the difference between sum and resummation
is that
sum is a quantity obtained by addition or aggregation while
resummation is a procedure to obtain a finite result from a divergent sum (series) of functions, involving the integral transformation of another (convergent) function in which the individual terms defining the original function are rescaled.
As a verb sum
is to add together.
divergent |
resummation |
As an adjective divergent
is growing further apart; diverging.
As a noun resummation is
a procedure to obtain a finite result from a divergent sum (series) of functions, involving the integral transformation of another (convergent) function in which the individual terms defining the original function are rescaled.
finite |
resummation |
As an adjective finite
is having an end or limit; constrained by bounds.
As a noun resummation is
(mathematics|physics) a procedure to obtain a finite result from a divergent sum (series) of functions, involving the integral transformation of another (convergent) function in which the individual terms defining the original function are rescaled.
procedure |
resummation |
As nouns the difference between procedure and resummation
is that
procedure is procedure while
resummation is (mathematics|physics) a procedure to obtain a finite result from a divergent sum (series) of functions, involving the integral transformation of another (convergent) function in which the individual terms defining the original function are rescaled.
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