Duality for Lipschitz p-summing operators

Abstract: Building upon the ideas of R. Arens and J. Eells (1956) [1] we introduce the concept of spaces of Banachspace-valued molecules, whose duals can be naturally identified with spaces of operators between a metric space and a Banach space. On these spaces we define analogues of the tensor norms of Chevet (1969) [3] and Saphar (1970) [14], whose duals are spaces of Lipschitz p-summing operators. In particular, we identify the dual of the space of Lipschitz p-summing operators from a finite metric space to a Banach… Show more

“…Moreover, Chen and Zheng [5] introduced and studied strongly Lipschitz p-nuclear operators and Lipschitz p-nuclear operators. Chávez-Domínguez introduced and investigated Lipschitz (p, r, s)-summing operators and Lipschitz (q, p)-mixing operators in [2] and [3], respectively.…”

Lipschitz compact operators

“…Moreover, Chen and Zheng [5] introduced and studied strongly Lipschitz p-nuclear operators and Lipschitz p-nuclear operators. Chávez-Domínguez introduced and investigated Lipschitz (p, r, s)-summing operators and Lipschitz (q, p)-mixing operators in [2] and [3], respectively.…”

Lipschitz compact operators

“…In [4], the author has studied the class Π L p (X; E) of Lipschitz p-summing operators. He has defined a norm on the space of molecules F (X; E) of which we have the next duality Π L p (X; E * ) = F csp (X; E) * , where cs p is defined by…”

On the composition ideals of Lipschitz mappings

“…The nonlinear theory of absolutely summing operators has been rapidly developed by several authors (see, e.g., [1,4,[6][7][8][10][11][12]18,20,[22][23][24][27][28][29][30][31]33]). A natural question is whether extrapolation theorems hold for nonlinear summing operators.…”

Abstract extrapolation theorems for absolutely summing nonlinear operators