det I — 2 Ktc apð1 — e—
ÞA0 GðiocÞ
¼ 0, (3)
relationship between the cutting force and vibrations at the tool tip become:
GðioÞ ftðioÞ ¼ utðioÞ。 (1)
In general, GðioÞ would be a 3 ~ 3 matrix, as displace- ments and the force vector are defined in the three- dimensional Cartesian system。 However in the milling process, the axial direction (Z) is typically much stiffer than the feed force direction (X) and the cross feed force direction (Y) (see Fig。 1)。 Therefore
" GXX ðioÞ GXY ðioÞ #
where ap is the nominal depth of cut, Ktc is the tangential cutting coefficient, oc is the chatter frequency, T is the tooth passage period and A0 is the immersion dependent matrix which is a function of the cutting coefficients。
The cutting experiments were done for estimating the cutting coefficients and to verify the analytical stability lobes by verifying the regions of stability and instability。 The cutting coefficients are constant for a given tool insert–workpiece combination and not affected by the change in machine structure。 The axial cutting coefficients are not necessary for finding the stability lobes because the
structure has been assumed rigid along the axial direction。
Feed and cross-feed forces were measured while cutting in full immersion with two inserts only。 The mechanistic
Here, GXX and GYY are FRFs that were experimentally
determined by an impact hammer test。 The off-diagonal cross coupling terms GXY, GYX in Eq。 (2) are relatively small and are neglected。
The vibrations of the machine affect the quality of machining due to chatter (i。e。, regenerative self excited vibrations)。 Chatter occurs due to the interaction of the workpiece and tool, which leads to vibrations near one of the structural modes。 At some combinations of spindle speed and depth of cut, the cutting forces can become unstable and cause chatter。 The analytical chatter predic- tion model presented by Altintas and Budak [22,23] gives
cutting force model [22] for the milling cutting process is described as
FX ¼ —Ktc ap f t sin f sin f — Kte ap sin f
— Krc ap f t sin f cos f — Kre ap cos f,
FY ¼ Ktc ap f t sin f cos f þ Kte ap cos f
— Krc ap f t sin f sin f — Kre ap cos f。 ð4Þ
Knowing FX, FY for different values of instantaneous cutter angular locations f, the cutting coefficients Ktc, Kte, Krc and Kre can be estimated using the least-squares approach。 The forces FX and FY are the components of ft in
T
the characteristic equation of the milling process and
Eq。 (1), i。e。, ft ¼ ½FX ; FY ]
。 The constants Ktc and Krc arise
equates it to zero to find the stability limit。 The characteristic equation for finding the stability limit for
due to the shearing action in the tangential and radial directions respectively。 Kte and Kre are the corresponding
330 J。 Dhupia et al。 / International Journal of Machine Tools & Manufacture 47 (2007) 326–334
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