Definition of $L^0$ space - Mathematics Stack Exchange it's defined in the Wikipedia article (not as a norm, which is why I used quotes) The Wikipedia article defines the topology induced by the "norm," which is convergence in measure
Where does the definition of the $L_0$ norm come from? The $L_0$ norm of $x$ is $\sum\limits_k x_k^0$, in a similar manner to $L_p$ norms for $p \ge 1$, but avoiding the problem of dividing by zero that would come from
Boundedness in $L^0$ space - Mathematics Stack Exchange Yes I understand the boundedness in Lp space which has the definition of norm But L0 space does not have the norm So I want to see the exact definition of boundedness in L0 space Does it mean the integral of f ∊C is finite?
Understanding L1 and L2 norms - Mathematics Stack Exchange I am not a mathematics student but somehow have to know about L1 and L2 norms I am looking for some appropriate sources to learn these things and know they work and what are their differences I am
Zero norm properties - Mathematics Stack Exchange I have seen the claim that the l0-norm ($\|X\|_0$ = support (X)) is a pseudo-norm because it does not satisfy all properties of a norm I thought it to be triangle inequality, but am not able to show it by example