There are three definitions of infinite-dimensional complex manifolds: strong (existence of holomorphic charts), weak (abundance of holomorphic functions) and formal (vanishing of Nijenhuis tensor). The implications "strong" $\Rightarrow$ "weak" $\Rightarrow$ "formal" are strict.The Kahler property is closedness of Hermitian form, and it is no different from finite-dimensional case. All these properties are inherited for submanifolds or immersed manifolds.
Of course, the original question as stated
("if N→fM is a holomorphic map with maximal rank at each point, then N is Kähler with the pullback form induced by M") makes no sense either finite-dimensional or infinite-dimensional: if $f$ has non-Kahler fibers, $N$ would be non-Kahler regardless, and there are examples of holomorphic fibrations with Kahler fibers and base and non-Kahler total space. I guess David meant that dimension of $N$ is less or equal to that of $M$.
Some reference to infinite-dimensional Kahler manifolds:
J. L. Brylinski, {\em Loop Spaces, Characteristic Classes and
Geometric Quantization,} Progr. Math., vol. 107, Birkh\"auser
Boston, Boston, MA, 1993.
LeBrun, Claude,
{\em A K\"ahler
structure on the space of string worldsheets},
Classical Quantum Gravity 10 (1993), no. 9, L141--L148.
Lempert, L\'aszl\'o,
{\em Loop spaces as complex manifolds,}
J. Differential Geom. 38 (1993), no. 3, 519--543.
Lempert, L\'aszl\'o,
{\em The Dolbeault complex in infinite dimensions. I},
J. Amer. Math. Soc. 11 (1998), no. 3, 485--520.
M. V. Movshev,
{\em The structure of a symplectic manifold on the space of
loops of 7-manifold}, arXiv:math/9911100, 10 pages.
Verbitsky, M., {\em A formally Kaehler structure on a knot space
of a $G_2$-manifold}, arXiv:1003.3174, 24 pages.
