08/25/2010, 06:07 PM
without going into details , the idea is simple.
ignoring some details we consider :
we have a continuum sum operator.
tet'(x) = tet'(0)* continuum product till tet(x).
we can use the continuum sum to compute the continuum product.
once we have tet'(x) , we can find tet(x) by integration.
the problem with the above is that its an equation with selfreference.
the proposed solution is to do the same but with iteration.
consider any coo solution to tet(x).
thats our starting function tet_0(x).
tet_1 ' (x) = tet_0 ' (0) * continuum product till tet_0 (x).
tet_1 (x) = integral tet_1 ' (x).
we continue :
tet_2 ' (x) = tet_1 ' (0) * continuum product till tet_1 (x).
tet_2 (x) = integral tet_2 ' (x).
etc
till we get our converging limit.
basicly ...
tommy1729
ignoring some details we consider :
we have a continuum sum operator.
tet'(x) = tet'(0)* continuum product till tet(x).
we can use the continuum sum to compute the continuum product.
once we have tet'(x) , we can find tet(x) by integration.
the problem with the above is that its an equation with selfreference.
the proposed solution is to do the same but with iteration.
consider any coo solution to tet(x).
thats our starting function tet_0(x).
tet_1 ' (x) = tet_0 ' (0) * continuum product till tet_0 (x).
tet_1 (x) = integral tet_1 ' (x).
we continue :
tet_2 ' (x) = tet_1 ' (0) * continuum product till tet_1 (x).
tet_2 (x) = integral tet_2 ' (x).
etc
till we get our converging limit.
basicly ...
tommy1729