Vertical fractional scrolling means shifting text in a window up or down by a specified multiple or fraction of a line. Each window has a vertical scroll position, which is a number, never less than zero. It specifies how far to raise the contents of the window. Raising the window contents generally makes all or part of some lines disappear off the top, and all or part of some other lines appear at the bottom. The usual value is zero.
The vertical scroll position is measured in units of the normal line height, which is the height of the default font. Thus, if the value is .5, that means the window contents are scrolled up half the normal line height. If it is 3.3, that means the window contents are scrolled up somewhat over three times the normal line height.
What fraction of a line the vertical scrolling covers, or how many lines, depends on what the lines contain. A value of .5 could scroll a line whose height is very short off the screen, while a value of 3.3 could scroll just part of the way through a tall line or an image.
window-vscroll&optional window pixels-p
This function returns the current vertical scroll position of
window. The default for window is the selected window.
If pixels-p is non-
nil, the return value is measured in
pixels, rather than in units of the normal line height.
(window-vscroll) ⇒ 0
set-window-vscrollwindow lines &optional pixels-p
This function sets window’s vertical scroll position to
lines. If window is
nil, the selected window is
used. The argument lines should be zero or positive; if not, it
is taken as zero.
The actual vertical scroll position must always correspond to an integral number of pixels, so the value you specify is rounded accordingly.
The return value is the result of this rounding.
(set-window-vscroll (selected-window) 1.2) ⇒ 1.13
If pixels-p is non-
nil, lines specifies a number of
pixels. In this case, the return value is lines.
If this variable is non-
scroll-down functions will automatically
modify the vertical scroll position to scroll through display rows
that are taller than the height of the window, for example in the
presence of large images.